[sgt/puzzles] / loopgen.c

/*
 * loopgen.c: loop generation functions for grid.[ch].
 */

#include <stdio.h>
#include <stdlib.h>
#include <stddef.h>
#include <string.h>
#include <assert.h>
#include <ctype.h>
#include <math.h>

#include "puzzles.h"
#include "tree234.h"
#include "grid.h"
#include "loopgen.h"


/* We're going to store lists of current candidate faces for colouring black
 * or white.
 * Each face gets a 'score', which tells us how adding that face right
 * now would affect the curliness of the solution loop.  We're trying to
 * maximise that quantity so will bias our random selection of faces to
 * colour those with high scores */
struct face_score {
    int white_score;
    int black_score;
    unsigned long random;
    /* No need to store a grid_face* here.  The 'face_scores' array will
     * be a list of 'face_score' objects, one for each face of the grid, so
     * the position (index) within the 'face_scores' array will determine
     * which face corresponds to a particular face_score.
     * Having a single 'face_scores' array for all faces simplifies memory
     * management, and probably improves performance, because we don't have to 
     * malloc/free each individual face_score, and we don't have to maintain
     * a mapping from grid_face* pointers to face_score* pointers.
     */
};

static int generic_sort_cmpfn(void *v1, void *v2, size_t offset)
{
    struct face_score *f1 = v1;
    struct face_score *f2 = v2;
    int r;

    r = *(int *)((char *)f2 + offset) - *(int *)((char *)f1 + offset);
    if (r) {
        return r;
    }

    if (f1->random < f2->random)
        return -1;
    else if (f1->random > f2->random)
        return 1;

    /*
     * It's _just_ possible that two faces might have been given
     * the same random value. In that situation, fall back to
     * comparing based on the positions within the face_scores list.
     * This introduces a tiny directional bias, but not a significant one.
     */
    return f1 - f2;
}

static int white_sort_cmpfn(void *v1, void *v2)
{
    return generic_sort_cmpfn(v1, v2, offsetof(struct face_score,white_score));
}

static int black_sort_cmpfn(void *v1, void *v2)
{
    return generic_sort_cmpfn(v1, v2, offsetof(struct face_score,black_score));
}

/* 'board' is an array of enum face_colour, indicating which faces are
 * currently black/white/grey.  'colour' is FACE_WHITE or FACE_BLACK.
 * Returns whether it's legal to colour the given face with this colour. */
static int can_colour_face(grid *g, char* board, int face_index,
                           enum face_colour colour)
{
    int i, j;
    grid_face *test_face = g->faces + face_index;
    grid_face *starting_face, *current_face;
    grid_dot *starting_dot;
    int transitions;
    int current_state, s; /* booleans: equal or not-equal to 'colour' */
    int found_same_coloured_neighbour = FALSE;
    assert(board[face_index] != colour);

    /* Can only consider a face for colouring if it's adjacent to a face
     * with the same colour. */
    for (i = 0; i < test_face->order; i++) {
        grid_edge *e = test_face->edges[i];
        grid_face *f = (e->face1 == test_face) ? e->face2 : e->face1;
        if (FACE_COLOUR(f) == colour) {
            found_same_coloured_neighbour = TRUE;
            break;
        }
    }
    if (!found_same_coloured_neighbour)
        return FALSE;

    /* Need to avoid creating a loop of faces of this colour around some
     * differently-coloured faces.
     * Also need to avoid meeting a same-coloured face at a corner, with
     * other-coloured faces in between.  Here's a simple test that (I believe)
     * takes care of both these conditions:
     *
     * Take the circular path formed by this face's edges, and inflate it
     * slightly outwards.  Imagine walking around this path and consider
     * the faces that you visit in sequence.  This will include all faces
     * touching the given face, either along an edge or just at a corner.
     * Count the number of 'colour'/not-'colour' transitions you encounter, as
     * you walk along the complete loop.  This will obviously turn out to be
     * an even number.
     * If 0, we're either in the middle of an "island" of this colour (should
     * be impossible as we're not supposed to create black or white loops),
     * or we're about to start a new island - also not allowed.
     * If 4 or greater, there are too many separate coloured regions touching
     * this face, and colouring it would create a loop or a corner-violation.
     * The only allowed case is when the count is exactly 2. */

    /* i points to a dot around the test face.
     * j points to a face around the i^th dot.
     * The current face will always be:
     *     test_face->dots[i]->faces[j]
     * We assume dots go clockwise around the test face,
     * and faces go clockwise around dots. */

    /*
     * The end condition is slightly fiddly. In sufficiently strange
     * degenerate grids, our test face may be adjacent to the same
     * other face multiple times (typically if it's the exterior
     * face). Consider this, in particular:
     * 
     *   +--+
     *   |  |
     *   +--+--+
     *   |  |  |
     *   +--+--+
     * 
     * The bottom left face there is adjacent to the exterior face
     * twice, so we can't just terminate our iteration when we reach
     * the same _face_ we started at. Furthermore, we can't
     * condition on having the same (i,j) pair either, because
     * several (i,j) pairs identify the bottom left contiguity with
     * the exterior face! We canonicalise the (i,j) pair by taking
     * one step around before we set the termination tracking.
     */

    i = j = 0;
    current_face = test_face->dots[0]->faces[0];
    if (current_face == test_face) {
        j = 1;
        current_face = test_face->dots[0]->faces[1];
    }
    transitions = 0;
    current_state = (FACE_COLOUR(current_face) == colour);
    starting_dot = NULL;
    starting_face = NULL;
    while (TRUE) {
        /* Advance to next face.
         * Need to loop here because it might take several goes to
         * find it. */
        while (TRUE) {
            j++;
            if (j == test_face->dots[i]->order)
                j = 0;

            if (test_face->dots[i]->faces[j] == test_face) {
                /* Advance to next dot round test_face, then
                 * find current_face around new dot
                 * and advance to the next face clockwise */
                i++;
                if (i == test_face->order)
                    i = 0;
                for (j = 0; j < test_face->dots[i]->order; j++) {
                    if (test_face->dots[i]->faces[j] == current_face)
                        break;
                }
                /* Must actually find current_face around new dot,
                 * or else something's wrong with the grid. */
                assert(j != test_face->dots[i]->order);
                /* Found, so advance to next face and try again */
            } else {
                break;
            }
        }
        /* (i,j) are now advanced to next face */
        current_face = test_face->dots[i]->faces[j];
        s = (FACE_COLOUR(current_face) == colour);
	if (!starting_dot) {
	    starting_dot = test_face->dots[i];
	    starting_face = current_face;
	    current_state = s;
	} else {
	    if (s != current_state) {
		++transitions;
		current_state = s;
		if (transitions > 2)
		    break;
	    }
	    if (test_face->dots[i] == starting_dot &&
		current_face == starting_face)
		break;
        }
    }

    return (transitions == 2) ? TRUE : FALSE;
}

/* Count the number of neighbours of 'face', having colour 'colour' */
static int face_num_neighbours(grid *g, char *board, grid_face *face,
                               enum face_colour colour)
{
    int colour_count = 0;
    int i;
    grid_face *f;
    grid_edge *e;
    for (i = 0; i < face->order; i++) {
        e = face->edges[i];
        f = (e->face1 == face) ? e->face2 : e->face1;
        if (FACE_COLOUR(f) == colour)
            ++colour_count;
    }
    return colour_count;
}

/* The 'score' of a face reflects its current desirability for selection
 * as the next face to colour white or black.  We want to encourage moving
 * into grey areas and increasing loopiness, so we give scores according to
 * how many of the face's neighbours are currently coloured the same as the
 * proposed colour. */
static int face_score(grid *g, char *board, grid_face *face,
                      enum face_colour colour)
{
    /* Simple formula: score = 0 - num. same-coloured neighbours,
     * so a higher score means fewer same-coloured neighbours. */
    return -face_num_neighbours(g, board, face, colour);
}

/*
 * Generate a new complete random closed loop for the given grid.
 *
 * The method is to generate a WHITE/BLACK colouring of all the faces,
 * such that the WHITE faces will define the inside of the path, and the
 * BLACK faces define the outside.
 * To do this, we initially colour all faces GREY.  The infinite space outside
 * the grid is coloured BLACK, and we choose a random face to colour WHITE.
 * Then we gradually grow the BLACK and the WHITE regions, eliminating GREY
 * faces, until the grid is filled with BLACK/WHITE.  As we grow the regions,
 * we avoid creating loops of a single colour, to preserve the topological
 * shape of the WHITE and BLACK regions.
 * We also try to make the boundary as loopy and twisty as possible, to avoid
 * generating paths that are uninteresting.
 * The algorithm works by choosing a BLACK/WHITE colour, then choosing a GREY
 * face that can be coloured with that colour (without violating the
 * topological shape of that region).  It's not obvious, but I think this
 * algorithm is guaranteed to terminate without leaving any GREY faces behind.
 * Indeed, if there are any GREY faces at all, both the WHITE and BLACK
 * regions can be grown.
 * This is checked using assert()ions, and I haven't seen any failures yet.
 *
 * Hand-wavy proof: imagine what can go wrong...
 *
 * Could the white faces get completely cut off by the black faces, and still
 * leave some grey faces remaining?
 * No, because then the black faces would form a loop around both the white
 * faces and the grey faces, which is disallowed because we continually
 * maintain the correct topological shape of the black region.
 * Similarly, the black faces can never get cut off by the white faces.  That
 * means both the WHITE and BLACK regions always have some room to grow into
 * the GREY regions.
 * Could it be that we can't colour some GREY face, because there are too many
 * WHITE/BLACK transitions as we walk round the face? (see the
 * can_colour_face() function for details)
 * No.  Imagine otherwise, and we see WHITE/BLACK/WHITE/BLACK as we walk
 * around the face.  The two WHITE faces would be connected by a WHITE path,
 * and the BLACK faces would be connected by a BLACK path.  These paths would
 * have to cross, which is impossible.
 * Another thing that could go wrong: perhaps we can't find any GREY face to
 * colour WHITE, because it would create a loop-violation or a corner-violation
 * with the other WHITE faces?
 * This is a little bit tricky to prove impossible.  Imagine you have such a
 * GREY face (that is, if you coloured it WHITE, you would create a WHITE loop
 * or corner violation).
 * That would cut all the non-white area into two blobs.  One of those blobs
 * must be free of BLACK faces (because the BLACK stuff is a connected blob).
 * So we have a connected GREY area, completely surrounded by WHITE
 * (including the GREY face we've tentatively coloured WHITE).
 * A well-known result in graph theory says that you can always find a GREY
 * face whose removal leaves the remaining GREY area connected.  And it says
 * there are at least two such faces, so we can always choose the one that
 * isn't the "tentative" GREY face.  Colouring that face WHITE leaves
 * everything nice and connected, including that "tentative" GREY face which
 * acts as a gateway to the rest of the non-WHITE grid.
 */
void generate_loop(grid *g, char *board, random_state *rs,
                   loopgen_bias_fn_t bias, void *biasctx)
{
    int i, j;
    int num_faces = g->num_faces;
    struct face_score *face_scores; /* Array of face_score objects */
    struct face_score *fs; /* Points somewhere in the above list */
    struct grid_face *cur_face;
    tree234 *lightable_faces_sorted;
    tree234 *darkable_faces_sorted;
    int *face_list;
    int do_random_pass;

    /* Make a board */
    memset(board, FACE_GREY, num_faces);
    
    /* Create and initialise the list of face_scores */
    face_scores = snewn(num_faces, struct face_score);
    for (i = 0; i < num_faces; i++) {
        face_scores[i].random = random_bits(rs, 31);
        face_scores[i].black_score = face_scores[i].white_score = 0;
    }
    
    /* Colour a random, finite face white.  The infinite face is implicitly
     * coloured black.  Together, they will seed the random growth process
     * for the black and white areas. */
    i = random_upto(rs, num_faces);
    board[i] = FACE_WHITE;

    /* We need a way of favouring faces that will increase our loopiness.
     * We do this by maintaining a list of all candidate faces sorted by
     * their score and choose randomly from that with appropriate skew.
     * In order to avoid consistently biasing towards particular faces, we
     * need the sort order _within_ each group of scores to be completely
     * random.  But it would be abusing the hospitality of the tree234 data
     * structure if our comparison function were nondeterministic :-).  So with
     * each face we associate a random number that does not change during a
     * particular run of the generator, and use that as a secondary sort key.
     * Yes, this means we will be biased towards particular random faces in
     * any one run but that doesn't actually matter. */

    lightable_faces_sorted = newtree234(white_sort_cmpfn);
    darkable_faces_sorted = newtree234(black_sort_cmpfn);

    /* Initialise the lists of lightable and darkable faces.  This is
     * slightly different from the code inside the while-loop, because we need
     * to check every face of the board (the grid structure does not keep a
     * list of the infinite face's neighbours). */
    for (i = 0; i < num_faces; i++) {
        grid_face *f = g->faces + i;
        struct face_score *fs = face_scores + i;
        if (board[i] != FACE_GREY) continue;
        /* We need the full colourability check here, it's not enough simply
         * to check neighbourhood.  On some grids, a neighbour of the infinite
         * face is not necessarily darkable. */
        if (can_colour_face(g, board, i, FACE_BLACK)) {
            fs->black_score = face_score(g, board, f, FACE_BLACK);
            add234(darkable_faces_sorted, fs);
        }
        if (can_colour_face(g, board, i, FACE_WHITE)) {
            fs->white_score = face_score(g, board, f, FACE_WHITE);
            add234(lightable_faces_sorted, fs);
        }
    }

    /* Colour faces one at a time until no more faces are colourable. */
    while (TRUE)
    {
        enum face_colour colour;
        tree234 *faces_to_pick;
        int c_lightable = count234(lightable_faces_sorted);
        int c_darkable = count234(darkable_faces_sorted);
        if (c_lightable == 0 && c_darkable == 0) {
            /* No more faces we can use at all. */
            break;
        }
	assert(c_lightable != 0 && c_darkable != 0);

        /* Choose a colour, and colour the best available face
         * with that colour. */
        colour = random_upto(rs, 2) ? FACE_WHITE : FACE_BLACK;

        if (colour == FACE_WHITE)
            faces_to_pick = lightable_faces_sorted;
        else
            faces_to_pick = darkable_faces_sorted;
        if (bias) {
            /*
             * Go through all the candidate faces and pick the one the
             * bias function likes best, breaking ties using the
             * ordering in our tree234 (which is why we replace only
             * if score > bestscore, not >=).
             */
            int j, k;
            struct face_score *best = NULL;
            int score, bestscore = 0;

            for (j = 0;
                 (fs = (struct face_score *)index234(faces_to_pick, j))!=NULL;
                 j++) {

                assert(fs);
                k = fs - face_scores;
                assert(board[k] == FACE_GREY);
                board[k] = colour;
                score = bias(biasctx, board, k);
                board[k] = FACE_GREY;
                bias(biasctx, board, k); /* let bias know we put it back */

                if (!best || score > bestscore) {
                    bestscore = score;
                    best = fs;
                }
            }
            fs = best;
        } else {
            fs = (struct face_score *)index234(faces_to_pick, 0);
        }
        assert(fs);
        i = fs - face_scores;
        assert(board[i] == FACE_GREY);
        board[i] = colour;
        if (bias)
            bias(biasctx, board, i); /* notify bias function of the change */

        /* Remove this newly-coloured face from the lists.  These lists should
         * only contain grey faces. */
        del234(lightable_faces_sorted, fs);
        del234(darkable_faces_sorted, fs);

        /* Remember which face we've just coloured */
        cur_face = g->faces + i;

        /* The face we've just coloured potentially affects the colourability
         * and the scores of any neighbouring faces (touching at a corner or
         * edge).  So the search needs to be conducted around all faces
         * touching the one we've just lit.  Iterate over its corners, then
         * over each corner's faces.  For each such face, we remove it from
         * the lists, recalculate any scores, then add it back to the lists
         * (depending on whether it is lightable, darkable or both). */
        for (i = 0; i < cur_face->order; i++) {
            grid_dot *d = cur_face->dots[i];
            for (j = 0; j < d->order; j++) {
                grid_face *f = d->faces[j];
                int fi; /* face index of f */

                if (f == NULL)
                    continue;
                if (f == cur_face)
                    continue;
                
                /* If the face is already coloured, it won't be on our
                 * lightable/darkable lists anyway, so we can skip it without 
                 * bothering with the removal step. */
                if (FACE_COLOUR(f) != FACE_GREY) continue; 

                /* Find the face index and face_score* corresponding to f */
                fi = f - g->faces;                
                fs = face_scores + fi;

                /* Remove from lightable list if it's in there.  We do this,
                 * even if it is still lightable, because the score might
                 * be different, and we need to remove-then-add to maintain
                 * correct sort order. */
                del234(lightable_faces_sorted, fs);
                if (can_colour_face(g, board, fi, FACE_WHITE)) {
                    fs->white_score = face_score(g, board, f, FACE_WHITE);
                    add234(lightable_faces_sorted, fs);
                }
                /* Do the same for darkable list. */
                del234(darkable_faces_sorted, fs);
                if (can_colour_face(g, board, fi, FACE_BLACK)) {
                    fs->black_score = face_score(g, board, f, FACE_BLACK);
                    add234(darkable_faces_sorted, fs);
                }
            }
        }
    }

    /* Clean up */
    freetree234(lightable_faces_sorted);
    freetree234(darkable_faces_sorted);
    sfree(face_scores);

    /* The next step requires a shuffled list of all faces */
    face_list = snewn(num_faces, int);
    for (i = 0; i < num_faces; ++i) {
        face_list[i] = i;
    }
    shuffle(face_list, num_faces, sizeof(int), rs);

    /* The above loop-generation algorithm can often leave large clumps
     * of faces of one colour.  In extreme cases, the resulting path can be 
     * degenerate and not very satisfying to solve.
     * This next step alleviates this problem:
     * Go through the shuffled list, and flip the colour of any face we can
     * legally flip, and which is adjacent to only one face of the opposite
     * colour - this tends to grow 'tendrils' into any clumps.
     * Repeat until we can find no more faces to flip.  This will
     * eventually terminate, because each flip increases the loop's
     * perimeter, which cannot increase for ever.
     * The resulting path will have maximal loopiness (in the sense that it
     * cannot be improved "locally".  Unfortunately, this allows a player to
     * make some illicit deductions.  To combat this (and make the path more
     * interesting), we do one final pass making random flips. */

    /* Set to TRUE for final pass */
    do_random_pass = FALSE;

    while (TRUE) {
        /* Remember whether a flip occurred during this pass */
        int flipped = FALSE;

        for (i = 0; i < num_faces; ++i) {
            int j = face_list[i];
            enum face_colour opp =
                (board[j] == FACE_WHITE) ? FACE_BLACK : FACE_WHITE;
            if (can_colour_face(g, board, j, opp)) {
                grid_face *face = g->faces +j;
                if (do_random_pass) {
                    /* final random pass */
                    if (!random_upto(rs, 10))
                        board[j] = opp;
                } else {
                    /* normal pass - flip when neighbour count is 1 */
                    if (face_num_neighbours(g, board, face, opp) == 1) {
                        board[j] = opp;
                        flipped = TRUE;
                    }
                }
            }
        }

        if (do_random_pass) break;
        if (!flipped) do_random_pass = TRUE;
    }

    sfree(face_list);
}
Commit	Line	Data
b760b8bd	1	/*
	2	* loopgen.c: loop generation functions for grid.[ch].
	3	*/
	4
	5	#include <stdio.h>
	6	#include <stdlib.h>
	7	#include <stddef.h>
	8	#include <string.h>
	9	#include <assert.h>
	10	#include <ctype.h>
	11	#include <math.h>
	12
	13	#include "puzzles.h"
	14	#include "tree234.h"
	15	#include "grid.h"
	16	#include "loopgen.h"
	17
	18
	19	/* We're going to store lists of current candidate faces for colouring black
	20	* or white.
	21	* Each face gets a 'score', which tells us how adding that face right
	22	* now would affect the curliness of the solution loop. We're trying to
	23	* maximise that quantity so will bias our random selection of faces to
	24	* colour those with high scores */
	25	struct face_score {
	26	int white_score;
	27	int black_score;
	28	unsigned long random;
	29	/* No need to store a grid_face* here. The 'face_scores' array will
	30	* be a list of 'face_score' objects, one for each face of the grid, so
	31	* the position (index) within the 'face_scores' array will determine
	32	* which face corresponds to a particular face_score.
	33	* Having a single 'face_scores' array for all faces simplifies memory
	34	* management, and probably improves performance, because we don't have to
	35	* malloc/free each individual face_score, and we don't have to maintain
	36	* a mapping from grid_face* pointers to face_score* pointers.
	37	*/
	38	};
	39
	40	static int generic_sort_cmpfn(void v1, void v2, size_t offset)
	41	{
	42	struct face_score *f1 = v1;
	43	struct face_score *f2 = v2;
	44	int r;
	45
	46	r = (int )((char )f2 + offset) - (int )((char )f1 + offset);
	47	if (r) {
	48	return r;
	49	}
	50
	51	if (f1->random < f2->random)
	52	return -1;
	53	else if (f1->random > f2->random)
	54	return 1;
	55
	56	/*
	57	* It's _just_ possible that two faces might have been given
	58	* the same random value. In that situation, fall back to
	59	* comparing based on the positions within the face_scores list.
	60	* This introduces a tiny directional bias, but not a significant one.
	61	*/
	62	return f1 - f2;
	63	}
	64
65	static int white_sort_cmpfn(void v1, void v2)
66	{
67	return generic_sort_cmpfn(v1, v2, offsetof(struct face_score,white_score));
68	}
69
70	static int black_sort_cmpfn(void v1, void v2)
71	{
72	return generic_sort_cmpfn(v1, v2, offsetof(struct face_score,black_score));
73	}
74
75	/* 'board' is an array of enum face_colour, indicating which faces are
76	* currently black/white/grey. 'colour' is FACE_WHITE or FACE_BLACK.
77	* Returns whether it's legal to colour the given face with this colour. */
78	static int can_colour_face(grid g, char board, int face_index,
79	enum face_colour colour)
80	{
81	int i, j;
82	grid_face *test_face = g->faces + face_index;
83	grid_face starting_face, current_face;
84	grid_dot *starting_dot;
85	int transitions;
86	int current_state, s; /* booleans: equal or not-equal to 'colour' */
87	int found_same_coloured_neighbour = FALSE;
88	assert(board[face_index] != colour);
89
90	/* Can only consider a face for colouring if it's adjacent to a face
91	* with the same colour. */
92	for (i = 0; i < test_face->order; i++) {
93	grid_edge *e = test_face->edges[i];
94	grid_face *f = (e->face1 == test_face) ? e->face2 : e->face1;
95	if (FACE_COLOUR(f) == colour) {
96	found_same_coloured_neighbour = TRUE;
97	break;
98	}
99	}
100	if (!found_same_coloured_neighbour)
101	return FALSE;
102
103	/* Need to avoid creating a loop of faces of this colour around some
104	* differently-coloured faces.
105	* Also need to avoid meeting a same-coloured face at a corner, with
106	* other-coloured faces in between. Here's a simple test that (I believe)
107	* takes care of both these conditions:
108	*
109	* Take the circular path formed by this face's edges, and inflate it
110	* slightly outwards. Imagine walking around this path and consider
111	* the faces that you visit in sequence. This will include all faces
112	* touching the given face, either along an edge or just at a corner.
113	* Count the number of 'colour'/not-'colour' transitions you encounter, as
114	* you walk along the complete loop. This will obviously turn out to be
115	* an even number.
116	* If 0, we're either in the middle of an "island" of this colour (should
117	* be impossible as we're not supposed to create black or white loops),
118	* or we're about to start a new island - also not allowed.
119	* If 4 or greater, there are too many separate coloured regions touching
120	* this face, and colouring it would create a loop or a corner-violation.
121	* The only allowed case is when the count is exactly 2. */
122
123	/* i points to a dot around the test face.
124	* j points to a face around the i^th dot.
125	* The current face will always be:
126	* test_face->dots[i]->faces[j]
127	* We assume dots go clockwise around the test face,
128	* and faces go clockwise around dots. */
129
130	/*
131	* The end condition is slightly fiddly. In sufficiently strange
132	* degenerate grids, our test face may be adjacent to the same
133	* other face multiple times (typically if it's the exterior
134	* face). Consider this, in particular:
135	*
136	* +--+
137	* \| \|
138	* +--+--+
139	* \| \| \|
140	* +--+--+
141	*
142	* The bottom left face there is adjacent to the exterior face
143	* twice, so we can't just terminate our iteration when we reach
144	* the same _face_ we started at. Furthermore, we can't
145	* condition on having the same (i,j) pair either, because
146	* several (i,j) pairs identify the bottom left contiguity with
147	* the exterior face! We canonicalise the (i,j) pair by taking
148	* one step around before we set the termination tracking.
149	*/
150
151	i = j = 0;
152	current_face = test_face->dots[0]->faces[0];
153	if (current_face == test_face) {
154	j = 1;
155	current_face = test_face->dots[0]->faces[1];
156	}
157	transitions = 0;
158	current_state = (FACE_COLOUR(current_face) == colour);
159	starting_dot = NULL;
160	starting_face = NULL;
161	while (TRUE) {
162	/* Advance to next face.
163	* Need to loop here because it might take several goes to
164	* find it. */
165	while (TRUE) {
166	j++;
167	if (j == test_face->dots[i]->order)
168	j = 0;
169
170	if (test_face->dots[i]->faces[j] == test_face) {
171	/* Advance to next dot round test_face, then
172	* find current_face around new dot
173	* and advance to the next face clockwise */
174	i++;
175	if (i == test_face->order)
176	i = 0;
177	for (j = 0; j < test_face->dots[i]->order; j++) {
178	if (test_face->dots[i]->faces[j] == current_face)
179	break;
180	}
181	/* Must actually find current_face around new dot,
182	* or else something's wrong with the grid. */
183	assert(j != test_face->dots[i]->order);
184	/* Found, so advance to next face and try again */
185	} else {
186	break;
187	}
188	}
189	/* (i,j) are now advanced to next face */
190	current_face = test_face->dots[i]->faces[j];
191	s = (FACE_COLOUR(current_face) == colour);
192	if (!starting_dot) {
193	starting_dot = test_face->dots[i];
194	starting_face = current_face;
195	current_state = s;
196	} else {
197	if (s != current_state) {
198	++transitions;
199	current_state = s;
200	if (transitions > 2)
201	break;
202	}
203	if (test_face->dots[i] == starting_dot &&
204	current_face == starting_face)
205	break;
206	}
207	}
208
209	return (transitions == 2) ? TRUE : FALSE;
210	}
211
212	/* Count the number of neighbours of 'face', having colour 'colour' */
213	static int face_num_neighbours(grid g, char board, grid_face *face,
214	enum face_colour colour)
215	{
216	int colour_count = 0;
217	int i;
218	grid_face *f;
219	grid_edge *e;
220	for (i = 0; i < face->order; i++) {
221	e = face->edges[i];
222	f = (e->face1 == face) ? e->face2 : e->face1;
223	if (FACE_COLOUR(f) == colour)
224	++colour_count;
225	}
226	return colour_count;
227	}
228
229	/* The 'score' of a face reflects its current desirability for selection
230	* as the next face to colour white or black. We want to encourage moving
231	* into grey areas and increasing loopiness, so we give scores according to
232	* how many of the face's neighbours are currently coloured the same as the
233	* proposed colour. */
234	static int face_score(grid g, char board, grid_face *face,
235	enum face_colour colour)
236	{
237	/* Simple formula: score = 0 - num. same-coloured neighbours,
238	* so a higher score means fewer same-coloured neighbours. */
239	return -face_num_neighbours(g, board, face, colour);
240	}
241
242	/*
243	* Generate a new complete random closed loop for the given grid.
244	*
245	* The method is to generate a WHITE/BLACK colouring of all the faces,
246	* such that the WHITE faces will define the inside of the path, and the
247	* BLACK faces define the outside.
248	* To do this, we initially colour all faces GREY. The infinite space outside
249	* the grid is coloured BLACK, and we choose a random face to colour WHITE.
250	* Then we gradually grow the BLACK and the WHITE regions, eliminating GREY
251	* faces, until the grid is filled with BLACK/WHITE. As we grow the regions,
252	* we avoid creating loops of a single colour, to preserve the topological
253	* shape of the WHITE and BLACK regions.
254	* We also try to make the boundary as loopy and twisty as possible, to avoid
255	* generating paths that are uninteresting.
256	* The algorithm works by choosing a BLACK/WHITE colour, then choosing a GREY
257	* face that can be coloured with that colour (without violating the
258	* topological shape of that region). It's not obvious, but I think this
259	* algorithm is guaranteed to terminate without leaving any GREY faces behind.
260	* Indeed, if there are any GREY faces at all, both the WHITE and BLACK
261	* regions can be grown.
262	* This is checked using assert()ions, and I haven't seen any failures yet.
263	*
264	* Hand-wavy proof: imagine what can go wrong...
265	*
266	* Could the white faces get completely cut off by the black faces, and still
267	* leave some grey faces remaining?
268	* No, because then the black faces would form a loop around both the white
269	* faces and the grey faces, which is disallowed because we continually
270	* maintain the correct topological shape of the black region.
271	* Similarly, the black faces can never get cut off by the white faces. That
272	* means both the WHITE and BLACK regions always have some room to grow into
273	* the GREY regions.
274	* Could it be that we can't colour some GREY face, because there are too many
275	* WHITE/BLACK transitions as we walk round the face? (see the
276	* can_colour_face() function for details)
277	* No. Imagine otherwise, and we see WHITE/BLACK/WHITE/BLACK as we walk
278	* around the face. The two WHITE faces would be connected by a WHITE path,
279	* and the BLACK faces would be connected by a BLACK path. These paths would
280	* have to cross, which is impossible.
281	* Another thing that could go wrong: perhaps we can't find any GREY face to
282	* colour WHITE, because it would create a loop-violation or a corner-violation
283	* with the other WHITE faces?
284	* This is a little bit tricky to prove impossible. Imagine you have such a
285	* GREY face (that is, if you coloured it WHITE, you would create a WHITE loop
286	* or corner violation).
287	* That would cut all the non-white area into two blobs. One of those blobs
288	* must be free of BLACK faces (because the BLACK stuff is a connected blob).
289	* So we have a connected GREY area, completely surrounded by WHITE
290	* (including the GREY face we've tentatively coloured WHITE).
291	* A well-known result in graph theory says that you can always find a GREY
292	* face whose removal leaves the remaining GREY area connected. And it says
293	* there are at least two such faces, so we can always choose the one that
294	* isn't the "tentative" GREY face. Colouring that face WHITE leaves
295	* everything nice and connected, including that "tentative" GREY face which
296	* acts as a gateway to the rest of the non-WHITE grid.
297	*/
298	void generate_loop(grid g, char board, random_state *rs,
299	loopgen_bias_fn_t bias, void *biasctx)
300	{
301	int i, j;
302	int num_faces = g->num_faces;
303	struct face_score face_scores; / Array of face_score objects */
304	struct face_score fs; / Points somewhere in the above list */
305	struct grid_face *cur_face;
306	tree234 *lightable_faces_sorted;
307	tree234 *darkable_faces_sorted;
308	int *face_list;
309	int do_random_pass;
310
311	/* Make a board */
312	memset(board, FACE_GREY, num_faces);
313
314	/* Create and initialise the list of face_scores */
315	face_scores = snewn(num_faces, struct face_score);
316	for (i = 0; i < num_faces; i++) {
317	face_scores[i].random = random_bits(rs, 31);
318	face_scores[i].black_score = face_scores[i].white_score = 0;
319	}
320
321	/* Colour a random, finite face white. The infinite face is implicitly
322	* coloured black. Together, they will seed the random growth process
323	* for the black and white areas. */
324	i = random_upto(rs, num_faces);
325	board[i] = FACE_WHITE;
326
327	/* We need a way of favouring faces that will increase our loopiness.
328	* We do this by maintaining a list of all candidate faces sorted by
329	* their score and choose randomly from that with appropriate skew.
330	* In order to avoid consistently biasing towards particular faces, we
331	* need the sort order _within_ each group of scores to be completely
332	* random. But it would be abusing the hospitality of the tree234 data
333	* structure if our comparison function were nondeterministic :-). So with
334	* each face we associate a random number that does not change during a
335	* particular run of the generator, and use that as a secondary sort key.
336	* Yes, this means we will be biased towards particular random faces in
337	* any one run but that doesn't actually matter. */
338
339	lightable_faces_sorted = newtree234(white_sort_cmpfn);
340	darkable_faces_sorted = newtree234(black_sort_cmpfn);
341
342	/* Initialise the lists of lightable and darkable faces. This is
343	* slightly different from the code inside the while-loop, because we need
344	* to check every face of the board (the grid structure does not keep a
345	* list of the infinite face's neighbours). */
346	for (i = 0; i < num_faces; i++) {
347	grid_face *f = g->faces + i;
348	struct face_score *fs = face_scores + i;
349	if (board[i] != FACE_GREY) continue;
350	/* We need the full colourability check here, it's not enough simply
351	* to check neighbourhood. On some grids, a neighbour of the infinite
352	* face is not necessarily darkable. */
353	if (can_colour_face(g, board, i, FACE_BLACK)) {
354	fs->black_score = face_score(g, board, f, FACE_BLACK);
355	add234(darkable_faces_sorted, fs);
356	}
357	if (can_colour_face(g, board, i, FACE_WHITE)) {
358	fs->white_score = face_score(g, board, f, FACE_WHITE);
359	add234(lightable_faces_sorted, fs);
360	}
361	}
362
363	/* Colour faces one at a time until no more faces are colourable. */
364	while (TRUE)
365	{
366	enum face_colour colour;
367	tree234 *faces_to_pick;
368	int c_lightable = count234(lightable_faces_sorted);
369	int c_darkable = count234(darkable_faces_sorted);
370	if (c_lightable == 0 && c_darkable == 0) {
371	/* No more faces we can use at all. */
372	break;
373	}
374	assert(c_lightable != 0 && c_darkable != 0);
375
376	/* Choose a colour, and colour the best available face
377	* with that colour. */
378	colour = random_upto(rs, 2) ? FACE_WHITE : FACE_BLACK;
379
380	if (colour == FACE_WHITE)
381	faces_to_pick = lightable_faces_sorted;
382	else
383	faces_to_pick = darkable_faces_sorted;
384	if (bias) {
385	/*
386	* Go through all the candidate faces and pick the one the
387	* bias function likes best, breaking ties using the
388	* ordering in our tree234 (which is why we replace only
389	* if score > bestscore, not >=).
390	*/
391	int j, k;
392	struct face_score *best = NULL;
393	int score, bestscore = 0;
394
395	for (j = 0;
396	(fs = (struct face_score *)index234(faces_to_pick, j))!=NULL;
397	j++) {
398
399	assert(fs);
400	k = fs - face_scores;
401	assert(board[k] == FACE_GREY);
402	board[k] = colour;
403	score = bias(biasctx, board, k);
404	board[k] = FACE_GREY;
405	bias(biasctx, board, k); /* let bias know we put it back */
406
407	if (!best \|\| score > bestscore) {
408	bestscore = score;
409	best = fs;
410	}
411	}
412	fs = best;
413	} else {
414	fs = (struct face_score *)index234(faces_to_pick, 0);
415	}
416	assert(fs);
417	i = fs - face_scores;
418	assert(board[i] == FACE_GREY);
419	board[i] = colour;
420	if (bias)
421	bias(biasctx, board, i); /* notify bias function of the change */
422
423	/* Remove this newly-coloured face from the lists. These lists should
424	* only contain grey faces. */
425	del234(lightable_faces_sorted, fs);
426	del234(darkable_faces_sorted, fs);
427
428	/* Remember which face we've just coloured */
429	cur_face = g->faces + i;
430
431	/* The face we've just coloured potentially affects the colourability
432	* and the scores of any neighbouring faces (touching at a corner or
433	* edge). So the search needs to be conducted around all faces
434	* touching the one we've just lit. Iterate over its corners, then
435	* over each corner's faces. For each such face, we remove it from
436	* the lists, recalculate any scores, then add it back to the lists
437	* (depending on whether it is lightable, darkable or both). */
438	for (i = 0; i < cur_face->order; i++) {
439	grid_dot *d = cur_face->dots[i];
440	for (j = 0; j < d->order; j++) {
441	grid_face *f = d->faces[j];
442	int fi; /* face index of f */
443
444	if (f == NULL)
445	continue;
446	if (f == cur_face)
447	continue;
448
449	/* If the face is already coloured, it won't be on our
450	* lightable/darkable lists anyway, so we can skip it without
451	* bothering with the removal step. */
452	if (FACE_COLOUR(f) != FACE_GREY) continue;
453
454	/* Find the face index and face_score* corresponding to f */
455	fi = f - g->faces;
456	fs = face_scores + fi;
457
458	/* Remove from lightable list if it's in there. We do this,
459	* even if it is still lightable, because the score might
460	* be different, and we need to remove-then-add to maintain
461	* correct sort order. */
462	del234(lightable_faces_sorted, fs);
463	if (can_colour_face(g, board, fi, FACE_WHITE)) {
464	fs->white_score = face_score(g, board, f, FACE_WHITE);
465	add234(lightable_faces_sorted, fs);
466	}
467	/* Do the same for darkable list. */
468	del234(darkable_faces_sorted, fs);
469	if (can_colour_face(g, board, fi, FACE_BLACK)) {
470	fs->black_score = face_score(g, board, f, FACE_BLACK);
471	add234(darkable_faces_sorted, fs);
472	}
473	}
474	}
475	}
476
477	/* Clean up */
478	freetree234(lightable_faces_sorted);
479	freetree234(darkable_faces_sorted);
480	sfree(face_scores);
481
482	/* The next step requires a shuffled list of all faces */
483	face_list = snewn(num_faces, int);
484	for (i = 0; i < num_faces; ++i) {
485	face_list[i] = i;
486	}
487	shuffle(face_list, num_faces, sizeof(int), rs);
488
489	/* The above loop-generation algorithm can often leave large clumps
490	* of faces of one colour. In extreme cases, the resulting path can be
491	* degenerate and not very satisfying to solve.
492	* This next step alleviates this problem:
493	* Go through the shuffled list, and flip the colour of any face we can
494	* legally flip, and which is adjacent to only one face of the opposite
495	* colour - this tends to grow 'tendrils' into any clumps.
496	* Repeat until we can find no more faces to flip. This will
497	* eventually terminate, because each flip increases the loop's
498	* perimeter, which cannot increase for ever.
499	* The resulting path will have maximal loopiness (in the sense that it
500	* cannot be improved "locally". Unfortunately, this allows a player to
501	* make some illicit deductions. To combat this (and make the path more
502	* interesting), we do one final pass making random flips. */
503
504	/* Set to TRUE for final pass */
505	do_random_pass = FALSE;
506
507	while (TRUE) {
508	/* Remember whether a flip occurred during this pass */
509	int flipped = FALSE;
510
511	for (i = 0; i < num_faces; ++i) {
512	int j = face_list[i];
513	enum face_colour opp =
514	(board[j] == FACE_WHITE) ? FACE_BLACK : FACE_WHITE;
515	if (can_colour_face(g, board, j, opp)) {
516	grid_face *face = g->faces +j;
517	if (do_random_pass) {
518	/* final random pass */
519	if (!random_upto(rs, 10))
520	board[j] = opp;
521	} else {
522	/* normal pass - flip when neighbour count is 1 */
523	if (face_num_neighbours(g, board, face, opp) == 1) {
524	board[j] = opp;
525	flipped = TRUE;
526	}
527	}
528	}
529	}
530
531	if (do_random_pass) break;
532	if (!flipped) do_random_pass = TRUE;
533	}
534
535	sfree(face_list);
536	}